2022
DOI: 10.48550/arxiv.2202.13691
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On the quadrature exactness in hyperinterpolation

Abstract: This paper investigates the role of quadrature exactness in the approximation scheme of hyperinterpolation. Constructing a hyperinterpolant of degree n requires an m-point positive-weight quadrature rule with exactness degree 2n. Aided by the Marcinkiewicz-Zygmund inequality, we affirm that when the required exactness degree 2n is relaxed to n + k with 0 < k ≤ n, the L 2 norm of the hyperinterpolation operator is bounded by a constant independent of n. The resulting scheme is convergent as n → ∞ if k is positi… Show more

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(6 citation statements)
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“…The approximation of F = Kf ∈ C(Ω) by efficient hyperinterpolation is described by Theorem 5.2. Thus, if we let K = 1, then both the stability result (5.6) and the error bound (5.7) of efficient hyperinterpolation reduce to (2.4) and (2.5) of the classical hyperinterpolation, respectively, derived in [3]. Furthermore, if the quadrature rule (1.4) has exactness degree 2n, that is, η = 0, then they reduce to the original results (2.1) and (2.2) derived by Sloan in [31].…”
Section: The Potential Inefficiency Of Classical Hyperinterpolation F...mentioning
confidence: 91%
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“…The approximation of F = Kf ∈ C(Ω) by efficient hyperinterpolation is described by Theorem 5.2. Thus, if we let K = 1, then both the stability result (5.6) and the error bound (5.7) of efficient hyperinterpolation reduce to (2.4) and (2.5) of the classical hyperinterpolation, respectively, derived in [3]. Furthermore, if the quadrature rule (1.4) has exactness degree 2n, that is, η = 0, then they reduce to the original results (2.1) and (2.2) derived by Sloan in [31].…”
Section: The Potential Inefficiency Of Classical Hyperinterpolation F...mentioning
confidence: 91%
“…In a recent work [3], we discussed what if the required exactness 2n is relaxed to n + n ′ , where 0 < n ′ ≤ n. This discussion provides a regime where efficient hyperinterpolation may perform much more accurately than classical hyperinterpolation. In particular, if K is continuous, we show that for the classical hyperinterpolation of degree n, the approximation error is bounded as…”
Section: The Approximation Basicsmentioning
confidence: 99%
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